A Marstrand-type restricted projection theorem in R3

Abstract

Marstrand's projection theorem from 1954 states that if K ⊂ R3 is an analytic set, then, for H2 almost every e ∈ S2, the orthogonal projection πe(K) of K to the line spanned by e has Hausdorff dimension \H K,1\. This paper contains the following sharper version of Marstrand's theorem. Let V ⊂ R3 be any 2-plane, which is not a subspace. Then, for H1 almost every e ∈ S2 V, the projection πe(K) has Hausdorff dimension \H K,1\. For 0 ≤ t < H K, we also prove an upper bound for the Hausdorff dimension of those vectors e ∈ S2 V with H e(K) ≤ t < H K.